AbstractWe find an explicit expression for the kernel of the scattering matrix for the Schrödinger operator containing at high energies all terms of power order. It turns out that the same expression gives a complete description of the diagonal singularities of the kernel in the angular variables. The formula obtained is in some sense universal since it applies both to short- and long-range electric as well as magnetic potentials
The author demonstrates that the amplitude of the high-energy scattering can be factorized in a prod...
AbstractWe show that fixed energy scattering measurements for the magnetic Schrödinger operator uniq...
Abstract. We study the scattering amplitude for Schrödinger operators at a critical energy level, w...
We find an explicit expression for the kernel of the scattering matrix for the Schrödinger operator ...
AbstractThe eigenfunction expansion theorem is extended to highly singular Schrödinger operators wit...
International audienceWe consider inverse scattering for the multidimensional Schrödinger equation w...
We consider the Schrödinger operator H = (i∇+ A)2 + V in the space L2(Rd) with long-range electrost...
An exact Fourier-Bessel representation of the scattering amplitude is introduced and discussed for p...
Scattering theory is, roughly speaking, perturbation theory of self-adjoint operators on the (absolu...
For fixed magnetic quantum number $m$ results on spectral properties and scattering theory are given...
AbstractWe consider the generalizedN-body Schrödinger operatorH=−Δ+q(x),q(x)=∑a∈Ava(xa),x∈Rd,xa∈Xa,R...
To study scattering amplitudes at high-energy, the T-product of two currents can be expanded in term...
We consider the Schrödinger operator H in the space L2(Rd) with a magnetic potential A(x) decaying ...
Dedicated with great pleasure to Israel Samoilovich Kac on the occasion of his 85th birthday. Abstra...
For a fixed magnetic quantum number m results on spectral properties and scattering theory are given...
The author demonstrates that the amplitude of the high-energy scattering can be factorized in a prod...
AbstractWe show that fixed energy scattering measurements for the magnetic Schrödinger operator uniq...
Abstract. We study the scattering amplitude for Schrödinger operators at a critical energy level, w...
We find an explicit expression for the kernel of the scattering matrix for the Schrödinger operator ...
AbstractThe eigenfunction expansion theorem is extended to highly singular Schrödinger operators wit...
International audienceWe consider inverse scattering for the multidimensional Schrödinger equation w...
We consider the Schrödinger operator H = (i∇+ A)2 + V in the space L2(Rd) with long-range electrost...
An exact Fourier-Bessel representation of the scattering amplitude is introduced and discussed for p...
Scattering theory is, roughly speaking, perturbation theory of self-adjoint operators on the (absolu...
For fixed magnetic quantum number $m$ results on spectral properties and scattering theory are given...
AbstractWe consider the generalizedN-body Schrödinger operatorH=−Δ+q(x),q(x)=∑a∈Ava(xa),x∈Rd,xa∈Xa,R...
To study scattering amplitudes at high-energy, the T-product of two currents can be expanded in term...
We consider the Schrödinger operator H in the space L2(Rd) with a magnetic potential A(x) decaying ...
Dedicated with great pleasure to Israel Samoilovich Kac on the occasion of his 85th birthday. Abstra...
For a fixed magnetic quantum number m results on spectral properties and scattering theory are given...
The author demonstrates that the amplitude of the high-energy scattering can be factorized in a prod...
AbstractWe show that fixed energy scattering measurements for the magnetic Schrödinger operator uniq...
Abstract. We study the scattering amplitude for Schrödinger operators at a critical energy level, w...
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